On complemented non-abelian chief factors of a Lie algebra
Abstract
The number of Frattini chief factors or of chief factors which are complemented by a maximal subalgebra of a finite-dimensional Lie algebra L is the same in every chief series for L, by [Theorem 2.3][11]. However, this is not the case for the number of chief factors which are simply complemented in L. In this paper we determine the possible variation in that number.
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